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Resumen de Convergence of the averages and finiteness of ergodic power funtions in weighted L1 spaces

Pedro Ortega Salvador Árbol académico

  • Let (X, F, µ) be a finite measure space. Let T: X ? X be a measure preserving transformation and let Anf denote the average of Tkf, k = 0, ..., n. Given a real positive function v on X, we prove that {Anf} converges in the a.e. sense for every f in L1(v dµ) if and only if infi = 0 v(Tix) > 0 a.e., and the same condition is equivalent to the finiteness of a related ergodic power function Prf for every f in L1(v dµ). We apply this result to characterize, being T null-preserving, the finite measures ? for which the sequence {Anf} converges a.e. for every f Î L1(d?) and to prove that uniform boundedness of the averages in L1 is sufficient for finiteness a.e. of Pr.


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